The displacement of a particle of mass `3g` executing simple harmonic motion is given by `x =3sin(0.2t)` in `SI` units. The kinetic energy of the particle at a point which is at a displacement equal to `1/3` of its amplitude from its mean position is

The displacement of a particle executing simple harmonic motion is given by y = 4 sin(2t + phi) . The period of oscillation is

The total energy of a particle having a displacement x, executing simple harmonic motion is

The displacement of a particle executing simple harmonic motion is given by y=A_(0)+A sin omegat+B cos omegat . Then the amplitude of its oscillation is given by

The displacement of a particle executing simple harmonic motion is given by x=3sin(2pit+(pi)/(4)) where x is in metres and t is in seconds. The amplitude and maximum speed of the particle is

A particle is executing simple harmonic motion. Its total energy is proportional to its

A particle executing simple harmonic motion with time period T. the time period with which its kinetic energy oscillates is

(b) The displacement of a particle executing simple harmonic motion is given by the equation y=0.3sin20pi(t+0.05) , where time t is in seconds and displacement y is in meter. Calculate the values of amplitude, time period, initial phase and initial displacement of the particle.

The simple harmonic motion of a particle is given by x = a sin 2 pit . Then, the location of the particle from its mean position at a time 1//8^(th) of second is

The displacement of a particle from its mean position (in metre) is given by y=0.2 "sin" (10 pi t+ 1.5 pi) "cos" (10 pi t+1.5 pi) The motion of the particle is

The instantaneous displacement x of a particle executing simple harmonic motion is given by x=a_1sinomegat+a_2cos(omegat+(pi)/(6)) . The amplitude A of oscillation is given by